Boundedness and Fredholmness of pseudodifferential operators in variable exponent spaces (Q930456)

The authors investigate the boundedness and Fredholmness of a certain class of singular type operators in the weighted spaces \(L^{p(\cdot)} (\mathbb R^n, w)\) with a variable exponent \(p (x)\) and power type weights \(w\). The results are applied to pseudodifferential operators of the Hörmander class \(OPS_{1,0}^{0}\) in weighted Sobolev type spaces \(H_{w}^{s,p (\cdot)} (\mathbb R^n)\) with constant smoothness \(s\).